## Exit Ticket- Graphs of Sine and Cosine - Section 4: Exit Ticket

# Graphs of Sine and Cosine

Lesson 8 of 19

## Objective: Students will be able to graph the parent function for sine and cosine.

*48 minutes*

I include **Warm ups** with a **Rubric** as part of my daily routine. My goal is to allow students to work on **Math Practice 3** each day. Grouping students into homogeneous pairs provides an opportunity for appropriately differentiated math conversations. The Video Narrative specifically explains this lesson’s Warm Up-Graphs of Sine and Cosine, which asks students to describe the trigonometric information obtained from the point (p,q) on a unit circle.

I also use this time to correct and record the previous day's Homework.

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This lesson give students the opportunity to physically build the graphs of sine and cosine using the unit circle. Several tools are needed for this investigation. Each pair of students needs:

- ruler
- two legal papers taped together length wise, or the regular papers taped together length wise ( I have TAs create these before hand)
- marker
- 10ish sticks of spaghetti
- 2 foot length of yarn
- glue (I used Elmer's)
- completed unit circle (Unit Circle)

The lesson begins with a review of the fact that the x value of any coordinate on a unit circle is also the cosine of the angle extending through that point (**Math Practice 7**). The sine is the same as the y value. This is key to the remainder of the lesson so I spend enough time here to make sure that the majority of the students are confident.

Each pair of students will be paired with another group. Out of each group of four, one pair creates a graph of sine and the other creates cosine. Since my students are already in pairs in desks next to each other, I pick two pairs that are in the same column to ease communication. My students won't be moving, we use the room as is. If your students are not already grouped, pick the pairs and then pairs of pairs beforehand. If there are an odd number of pairs, one group has three pairs where two pairs do the same graph. I assign each pair either sine or cosine before getting into the investigation.

All directions to the investigation are on the PowerPoint. I like to model steps either by doing a sample myself or by highlight a student's work. The first step of the investigation is to wrap the yarn around their unit function and mark each significant angle on the yarn with their marker (Yarn on Unit Circle).

Next they create the x- and y- axes on their paper. The x-axis should be along the center of the long length of the paper. The students label it θ. The y-axis should be placed 1/3 away from the left end of the paper and should be labeled either sinθ or cosθ.

The yarn is then laid across the positive portion of the x-axis with the end representing 0 radians at the origin (Yarn on Coordinate Plane). Each of the important angles from the unit circle is marked and labeled on the x-axis in both radians and degrees. Radians are a mathematically more significant unit, however, my students are just transitioning to radians so it will be helpful to them to see both.

The next step is the key to entire lesson. These students have never seen the graph of sine or cosine. They use pasta noodles to measure either the sine or cosine of each of the major angles on the unit circle (Pasta on Unit Circle). My goal is that they solidify and deepen their understanding of the fact that the x and y values are also the cosine and sine respectively on the unit circle. This is also a nice introduction to the shape and major features of these graphs in a very physical way (**Math Practice 5**). The noodles are glued above or below each appropriate angle on the coordinate plane (Pasta on Coordinate Plane). Once they have the first several lengths glued, I stop them for a second and ask them to think about how the negative sines or cosines should be represented on the graph. They talk with their partner and we discuss it as a class (**Math Practice 3**). They then continue their graphs. I circulate to ensure that the graphs are being properly constructed. (Pasta Sine Curve and Pasta Sine Curve 2)

Once they have finished gluing their pastas for the entire unit plane, I have them draw a curve using their marker. (Final Pasta Sine Curve) We do a think-pair-share on: Why is the function curve wider than the unit circle? Next, I ask them: What if we extended the graph to include negative angles? (**Math Practice 2**) Use your yarn and the pasta to graph the major negative angles. This can be cut if time is becoming an issue. Remind them watch the sign of their trig ratio and circulate to ensure that students are properly creating their graph.

I used the Activity Created by Michael D. Sturdivant to build this lesson.

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#### Section 3: Comparing Graphs

*10 min*

At this point the students get into their group of four and compare their graphs. First, they demonstrate how they found their graph. This should only take 2 or so minutes. The rest of the time is spent making a list of the similarities and differences between the two graphs (**Math Practice 1**).** ** Some things that could be mentioned include the intercepts, the shape, any equivalent coordinates. Once the students have made their list, we compile a class list.

Finally, I ask the students whether this is the entire graph of sine or cosine. If no one volunteers the fact that angles can go forever in either direction, I remind them of this fact or demonstrate by wrapping a piece of yarn around a unit circle multiple times.

#### Resources

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#### Exit Ticket

*3 min*

I use an exit ticket each day as a quick formative assessment to judge the success of the lesson.

Today's Exit Ticket asks students to list one similarity and one difference between the graphs of sine and cosine.

#### Resources

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This Homework is meant to solidify the student's understanding of the shape and basic features of both the sine and cosine graphs. They are asked to find the domain and range of the sine graph. They also apply two basic transformations, one vertical translation and one horizontal translation, to the sine graph as well as determine any changes that may have occurred to the domain and range. The final extension question asks how a person could use the graph to find angles that have the same sine? (**Math Practice 1 and 7**)

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- UNIT 1: Modeling with Expressions and Equations
- UNIT 2: Modeling with Functions
- UNIT 3: Polynomials
- UNIT 4: Complex Numbers and Quadratic Equations
- UNIT 5: Radical Functions and Equations
- UNIT 6: Polynomial Functions
- UNIT 7: Rational Functions
- UNIT 8: Exponential and Logarithmic Functions
- UNIT 9: Trigonometric Functions
- UNIT 10: Modeling Data with Statistics and Probability
- UNIT 11: Semester 1 Review
- UNIT 12: Semester 2 Review

- LESSON 1: Angle and Degree Measure
- LESSON 2: Trigonometric Ratios
- LESSON 3: Trigonometric Ratios of General Angles
- LESSON 4: Radians Day 1 of 2
- LESSON 5: Radians Day 2 of 2
- LESSON 6: The Unit Circle Day 1 of 2
- LESSON 7: The Unit Circle Day 2 of 2
- LESSON 8: Graphs of Sine and Cosine
- LESSON 9: Period and Amplitude
- LESSON 10: Period Puzzle
- LESSON 11: Transformations of Sine and Cosine Graphs
- LESSON 12: Graph of Tangent
- LESSON 13: Model Trigonometry with a Ferris Wheel Day 1 of 2
- LESSON 14: Model Trigonometry with a Ferris Wheel Day 2 of 2
- LESSON 15: Modeling Average Temperature with Trigonometry
- LESSON 16: Pythagorean Identity
- LESSON 17: Trigonometric Functions Review Day 1
- LESSON 18: Trigonometric Functions Review Day 2
- LESSON 19: Trigonometric Functions Test